## Proceedings of the International School of Physics "Enrico Fermi.", Volume 69N. Zanichelli, 1977 - Nuclear physics |

### From inside the book

Results 1-3 of 73

Page 21

Thus , the separation between the degenerate

gives the signaturedependent term in the rotational energy ( see ( 13 ) ) . In

particular , the K = 1 / 2

coefficient ...

Thus , the separation between the degenerate

**orbits**that occurs for finite wrotgives the signaturedependent term in the rotational energy ( see ( 13 ) ) . In

particular , the K = 1 / 2

**orbits**exhibit a separation that is linear in wo and thecoefficient ...

Page 22

In fact , this correlation prefers to have the particles pairwise occupying

are conjugate under time reversal ( or R ) and thus counteracts the rotational

alignment effect that separates these

In fact , this correlation prefers to have the particles pairwise occupying

**orbits**thatare conjugate under time reversal ( or R ) and thus counteracts the rotational

alignment effect that separates these

**orbits**. ( We shall return later to the ...Page 389

Basically , these corrections come about by treating in detail the consequences of

an

particular nucleus could be distributed over the

Basically , these corrections come about by treating in detail the consequences of

an

**orbit**- dependent , relative spin - and ... ways that the N active particles in aparticular nucleus could be distributed over the

**orbits**of the relevant major shell .### What people are saying - Write a review

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### Contents

Rotational degrees of freedom Deformation and | 3 |

86 | 8 |

the framework of a course such as the present The topics selected by | 10 |

Copyright | |

41 other sections not shown

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### Common terms and phrases

addition angular momentum appears approximation associated backbending band calculated closed collective compared comparison components configurations consider contributions corresponding coupling cross-sections deformation density dependence describe determined discussed distribution effects electron equations estimate evidence example excitation energy expected experiment experimental expression fact factor field given gives ground Hamiltonian hole included increase indicate inertia interaction Lett levels limit mass matrix elements measured modes motion neutron Nucl nuclear nuclei nucleons observed obtained operator orbits oscillator pairing parameters particle particular peak Phys physical possible potential predictions present processes proton quadrupole reaction region relation relative resonance respect rotational rule scattering seen shape shell model shown in fig shows simple single single-particle space spectra spectrum strength strong structure surface symmetry theory tion transfer transition values vibrational wave functions